On the density and surjectivity of SO(3)-Witten-Reshetikhin-Turaev quantum representations

Abstract

In this paper, we establish several new fundamental properties of SO(3)-quantum representations ρp,g,λ (Σg,n) PSUdp,g,λ of mapping class groups of surfaces, at prime-order roots of unity. We show that for any surface Σg,n of genus g≥ 3, any number n≥ 0 of punctures, and any coloration λ of the punctures, ρp,g,λ has dense image in the projective unitary group PSUdp,g,λ, extending a landmark result of Larsen and Wang. Moreover, we show that the representations ρp,g,λ are surjective modulo any unramified maximal ideal of Z[ζp], establishing an effective version of strong approximation for these representations. We also give several applications of our main results to residual finite simpleness of PMod(Σg,n) (answering a question of Masbaum and Reid); to subnormal cores of some subgroups of PMod(Σg,n); to realizability of congruence classes of quantum invariants; to embedding obstructions between 3-manifolds; and to homological stability for mapping class groups with coefficients in SO(3)-quantum representations.

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